A Spectral Theory of Polynomially Bounded Sequences and Applications to the Asymptotic Behavior of Discrete Systems

Abstract

In this paper using a transform defined by the translation operator we introduce the concept of spectrum of sequences that are bounded by n, where is a natural number. We apply this spectral theory to study the asymptotic behavior of solutions of fractional difference equations of the form α x(n)=Tx(n)+y(n), n∈ N, where 0<α 1. One of the obtained results is an extension of a famous Katznelson-Tzafriri Theorem, saying that if the α-resolvent operator Sα satisfies n∈N \| Sα (n)\| /n <∞ and for all z0∈ \z∈ C: \ |z|=1\, but z0=1, the complex function (z1-α(z-1)α -T)-1 \ exists and is holomorphic in a neighborhood of z0, then align* n ∞ 1n Σk=0+1 (+1)!k!(+1-k)! (-1)+1+k Sα (n+k) =0. align* Three concrete examples are also included to illustrate the obtained results.